#LyX 2.3 created this file. For more info see http://www.lyx.org/ \lyxformat 544 \begin_document \begin_header \save_transient_properties true \origin unavailable \textclass article \begin_preamble \usepackage{siunitx} \usepackage{pgfplots} \usepackage{listings} \usepackage{multicol} \sisetup{output-decimal-marker = {,}, quotient-mode=fraction, output-exponent-marker=\ensuremath{\mathrm{3}}} \end_preamble \use_default_options true \begin_modules enumitem \end_modules \maintain_unincluded_children false \language slovene \language_package default \inputencoding auto \fontencoding global \font_roman "default" "default" \font_sans "default" "default" \font_typewriter "default" "default" \font_math "auto" "auto" \font_default_family default \use_non_tex_fonts false \font_sc false \font_osf false \font_sf_scale 100 100 \font_tt_scale 100 100 \use_microtype false \use_dash_ligatures true \graphics default \default_output_format default \output_sync 0 \bibtex_command default \index_command default \paperfontsize default \spacing single \use_hyperref false \papersize default \use_geometry true \use_package amsmath 1 \use_package amssymb 1 \use_package cancel 1 \use_package esint 1 \use_package mathdots 1 \use_package mathtools 1 \use_package mhchem 1 \use_package stackrel 1 \use_package stmaryrd 1 \use_package undertilde 1 \cite_engine basic \cite_engine_type default \biblio_style plain \use_bibtopic false \use_indices false \paperorientation portrait \suppress_date false \justification false \use_refstyle 1 \use_minted 0 \index Index \shortcut idx \color #008000 \end_index \leftmargin 1cm \topmargin 2cm \rightmargin 1cm \bottommargin 2cm \headheight 1cm \headsep 1cm \footskip 1cm \secnumdepth 3 \tocdepth 3 \paragraph_separation indent \paragraph_indentation default \is_math_indent 0 \math_numbering_side default \quotes_style german \dynamic_quotes 0 \papercolumns 1 \papersides 1 \paperpagestyle default \tracking_changes false \output_changes false \html_math_output 0 \html_css_as_file 0 \html_be_strict false \end_header \begin_body \begin_layout Standard \begin_inset ERT status open \begin_layout Plain Layout \backslash newcommand \backslash euler{e} \end_layout \end_inset \end_layout \begin_layout Standard \begin_inset ERT status open \begin_layout Plain Layout \backslash begin{multicols}{2} \end_layout \end_inset \end_layout \begin_layout Standard \begin_inset Formula $\left(AB\right)^{T}=B^{T}+A^{T}$ \end_inset \end_layout \begin_layout Standard \begin_inset Formula $E_{ij}\left(\alpha\right)\coloneqq\texttt{i+=\ensuremath{\alpha}j}$ \end_inset , \begin_inset Formula $P_{ij}\coloneqq\texttt{i,j=j,i}$ \end_inset , \begin_inset Formula $E_{i}\left(\alpha\right)\coloneqq\texttt{i*=\ensuremath{\alpha}}$ \end_inset \end_layout \begin_layout Standard \begin_inset Formula $E_{ij}\left(\alpha\right)^{-1}=E_{ij}\left(\alpha\right)$ \end_inset , \begin_inset Formula $P_{ij}^{-1}=P_{ji}$ \end_inset , \begin_inset Formula $E_{i}\left(\beta\right)^{-1}=E_{i}\left(\beta^{-1}\right)$ \end_inset \end_layout \begin_layout Standard \begin_inset Formula $\nexists A_{m,n}^{-1}\Leftrightarrow A=0\Leftrightarrow m\not=n\Leftrightarrow\det A=0\Leftrightarrow A$ \end_inset ima \begin_inset Formula $\vec{0}$ \end_inset vrstico/stolpec \end_layout \begin_layout Paragraph Karakterizacija obrnljivih matrik \end_layout \begin_layout Standard \begin_inset ERT status open \begin_layout Plain Layout \backslash begin{multicols}{2} \end_layout \end_inset \end_layout \begin_layout Itemize \begin_inset Argument 1 status open \begin_layout Plain Layout label= \begin_inset Formula $\Leftrightarrow$ \end_inset \end_layout \end_inset \begin_inset Formula $\exists A^{-1}$ \end_inset \end_layout \begin_layout Itemize \begin_inset Formula $\exists B\ni:BA=I$ \end_inset \end_layout \begin_layout Itemize \begin_inset Formula $\exists B\ni:AB=I$ \end_inset \end_layout \begin_layout Itemize \begin_inset Formula $\left(AX=0\Longrightarrow X=0\right)$ \end_inset \end_layout \begin_layout Itemize stolpci so ogrodje \end_layout \begin_layout Itemize \begin_inset Formula $\text{RKSO}\left(A\right)=I$ \end_inset \end_layout \begin_layout Itemize \begin_inset Formula $\forall\vec{b}\exists\vec{x}\ni:A\vec{x}=\vec{b}$ \end_inset \end_layout \begin_layout Itemize \begin_inset Formula $A=$ \end_inset produkt E. M. \end_layout \begin_layout Standard \begin_inset ERT status open \begin_layout Plain Layout \backslash end{multicols} \end_layout \end_inset \end_layout \begin_layout Standard \begin_inset Note Note status open \begin_layout Plain Layout \begin_inset Formula $\exists A^{-1}\Longleftrightarrow\exists B\ni:BA=I\Longleftrightarrow\exists B\ni:AB=I\Longleftrightarrow$ \end_inset stolpci so LN \begin_inset Formula $\Longleftrightarrow\left(AX=0\Longrightarrow X=0\right)\Longleftrightarrow$ \end_inset stolpci so ogrodje \begin_inset Formula $\Longleftrightarrow\text{RKSO}\left(A\right)=$ \end_inset \begin_inset Formula $I\Longleftrightarrow\forall\vec{b}\exists\vec{x}\ni:A\vec{x}=\vec{b}\Longleftrightarrow A=$ \end_inset produkt E.M. \end_layout \end_inset \end_layout \begin_layout Standard Matrični zapis sistema: \begin_inset Formula $A\vec{x}=\vec{b}$ \end_inset \end_layout \begin_layout Standard Najkrajša rešitev sistema \begin_inset Formula $\vec{x_{0}}\Leftarrow\vert\vert A\vec{x_{0}}-\vec{b}\vert\vert=\min\vert\vert A\vec{x}-\vec{b}\vert\vert$ \end_inset \end_layout \begin_layout Standard ... je običajna rešitev \begin_inset Formula $A^{T}A\vec{x}=A^{T}\vec{b}$ \end_inset \end_layout \begin_layout Standard Desno množenje z E. M. je manipulacija stoplcev. \end_layout \begin_layout Standard \begin_inset Formula $\det\left[\begin{array}{cc} a & b\\ c & d \end{array}\right]=ad-bc$ \end_inset \end_layout \begin_layout Standard \begin_inset Formula $A_{i,j}\coloneqq A$ \end_inset brez \begin_inset Formula $i$ \end_inset te vrstice in \begin_inset Formula $j$ \end_inset tega stolpca \end_layout \begin_layout Standard \begin_inset Formula $\det[a]=a$ \end_inset , \begin_inset Formula $\det A=\sum_{k=1}^{n}\left(-1\right)^{k+1}a_{1,k}\det A_{1,j}$ \end_inset \end_layout \begin_layout Standard Razvoj po \begin_inset Formula $i$ \end_inset ti vrstici: \begin_inset Formula $\det A=\sum_{j=1}^{n}\left(-1\right)^{i+j}a_{ij}\det A_{ij}$ \end_inset \end_layout \begin_layout Standard Razvoj po \begin_inset Formula $j$ \end_inset tem stolpcu: \begin_inset Formula $\det A=\sum_{i=1}^{n}\left(-1\right)^{i+j}a_{ij}\det A_{ij}$ \end_inset \end_layout \begin_layout Standard \begin_inset Formula $\det$ \end_inset trikotne matrike: \begin_inset Formula $\prod_{i=1}^{n}a_{ii}$ \end_inset \end_layout \begin_layout Standard Trikotna matrika ima pod ali nad diagonalo same ničle. \end_layout \begin_layout Standard \begin_inset Formula $\det\left(P_{ij}A\right)=-detA,\quad\det\left(E_{i}\alpha A\right)=\alpha\det A$ \end_inset \end_layout \begin_layout Standard \begin_inset Formula $\det\left(E_{ij}\alpha A\right)=\det A,\quad\det\left(AB\right)=\det A\det B$ \end_inset \end_layout \begin_layout Standard \begin_inset Formula $\det\left[\begin{array}{cc} A & B\\ 0 & C \end{array}\right]=\det A\det C,\quad\det A^{T}=\det A$ \end_inset \end_layout \begin_layout Standard \begin_inset Formula \[ \det A^{n}=\left(\det A\right)^{n}\text{ velja tudi za inverz} \] \end_inset \end_layout \begin_layout Standard \begin_inset Formula $\det P_{ij}=-1,\quad\det E_{i}\left(\alpha\right)=\alpha,\quad\det E_{ij}\left(\alpha\right)=1$ \end_inset \end_layout \begin_layout Standard \begin_inset Formula $\det\mathbb{R}^{3}$ \end_inset : negativne diagonale prištejemo, pozitivne odštejemo \end_layout \begin_layout Paragraph Cramerjevo pravilo \end_layout \begin_layout Standard za rešitev sistema s kvadratno matriko koeficientov: \begin_inset Formula $x_{i}=\frac{\det A_{i}\left(\vec{b}\right)}{\det A}$ \end_inset , kjer je \begin_inset Formula $A_{i}\left(\vec{b}\right)$ \end_inset matrika \begin_inset Formula $A$ \end_inset , ki ima namesto \begin_inset Formula $i$ \end_inset -tega stolpca \begin_inset Formula $\vec{b}$ \end_inset . \end_layout \begin_layout Paragraph Inverz matrike \end_layout \begin_layout Standard \begin_inset Formula $A_{ij}^{-1}=\frac{\det A_{ji}\left(-1\right)^{j+i}}{\det A}=\frac{1}{\det A}\tilde{A}^{T}$ \end_inset , kjer je \begin_inset Formula $\tilde{A}$ \end_inset kofaktorska matrika: \begin_inset Formula $\tilde{A_{ij}}=\det A_{ji}\left(-1\right)^{i+j}$ \end_inset . \end_layout \begin_layout Paragraph Algebrske strukture \end_layout \begin_layout Standard grupoid: \begin_inset Formula $\left(M\not=\emptyset,\circ:\text{M\ensuremath{\times M\to M}}\right)$ \end_inset , \series bold polgrupa \series default je asociativen grupoid, \series bold monoid \series default je polgrupa z enoto, \series bold grupa \series default je monoid z inverzom za vsak element, \series bold abelova grupa \series default je komutativna. \end_layout \begin_layout Standard Desna enota: \begin_inset Formula $a\circ e=a$ \end_inset . Če je leva in desna, je enota. Grupoid ima kvečjemu eno enoto. Če je več levih, desne ni. \end_layout \begin_layout Standard Desni inverz: \begin_inset Formula $a\circ a^{-1}=e$ \end_inset . Če je levi in desni, je inverz. Inverz je enoličen. V monoidu je levi tudi desni. \end_layout \begin_layout Standard Ko je \begin_inset Formula $\left(M,\circ\right)$ \end_inset grupoid in \begin_inset Formula $N\subset M,N\not=\emptyset$ \end_inset , je \begin_inset Formula $N$ \end_inset \series bold podgrupoid \series default , če \begin_inset Formula $\forall a,b\in N:a\circ b\in N$ \end_inset . \begin_inset Formula $N$ \end_inset podeduje \begin_inset Formula $\circ$ \end_inset v \begin_inset Formula $\circ_{N}:N\times N\to N$ \end_inset . \begin_inset Formula $\circ_{N}$ \end_inset ohrani komutativnost in asociativnost. Enota se ne ohrani vedno, inverzi se ne ohranijo vedno. \end_layout \begin_layout Standard Ko je \begin_inset Formula $\left(M,\circ\right)$ \end_inset polgrupa, \begin_inset Formula $N$ \end_inset podgrupoid, je \series bold \begin_inset Formula $N$ \end_inset podpolgrupa \series default . \end_layout \begin_layout Standard Ko je \begin_inset Formula $\left(M,\circ\right)$ \end_inset monoid in \begin_inset Formula $N$ \end_inset podgrupoid, je \begin_inset Formula $N$ \end_inset \series bold podmonoid \series default , če vsebuje enoto \begin_inset Formula $\left(M,\circ\right)$ \end_inset (da, prav tisto). \end_layout \begin_layout Standard Ko je \begin_inset Formula $\left(M,\circ\right)$ \end_inset grupa in \begin_inset Formula $N$ \end_inset podmonoid, je \begin_inset Formula $N$ \end_inset \series bold podgrupa \series default , če vsebuje inverze vseh svojih elementov. \end_layout \begin_layout Standard \begin_inset Formula $N\not=\emptyset$ \end_inset je \series bold podgrupa \series default \begin_inset Formula $\left(M,\circ\right)$ \end_inset , ko \begin_inset Formula $a,b\in N\Rightarrow a\circ b^{-1}\in N$ \end_inset . \end_layout \begin_layout Standard \begin_inset Formula $GL_{n}$ \end_inset je grupa vseh obrnljivih matrik z množenjem matrik, \begin_inset Formula $O_{n}$ \end_inset je grupa matrik, kjer \begin_inset Formula $A^{T}=A^{-1}$ \end_inset (ortogonalne), \begin_inset Formula $SL_{n}$ \end_inset je grupa matrik z \begin_inset Formula $\det A=1$ \end_inset , \begin_inset Formula $SO_{n}$ \end_inset je grupa ortogonalnih matrik z \begin_inset Formula $\det A=1$ \end_inset . \end_layout \begin_layout Paragraph Homomorfizem \end_layout \begin_layout Standard grupoidov in polgrup \begin_inset Formula $\left(M_{1},\circ_{1}\right),\left(M_{2},\circ_{2}\right)$ \end_inset je \begin_inset Formula $f:M_{1}\to M_{2}\ni:\forall a,b\in M_{1}:\left(f\left(a\circ_{1}b\right)=f\left(a\right)\circ_{2}f\left(b\right)\right)$ \end_inset . \end_layout \begin_layout Standard Homomorfizem monoidov mora imeti še lastnost \begin_inset Formula $f\left(e_{1}\right)=e_{2}$ \end_inset , homomorfizem grup pa lastnost \begin_inset Formula $f\left(a^{-1}\right)=f\left(a\right)^{-1}$ \end_inset . \end_layout \begin_layout Standard Kompozitum homomorfizmov je homomorfizem. \end_layout \begin_layout Standard \series bold Izomorfizem \series default je bijektiven homomorfizem. Med izomorfnima grupama obstaja izomorfizem. \end_layout \begin_layout Standard \begin_inset Formula $\left(M,+,\cdot\right)$ \end_inset je \series bold bigrupoid \series default , ko sta \begin_inset Formula $\left(M,+\right)$ \end_inset in \begin_inset Formula $\left(M,\cdot\right)$ \end_inset grupoida. \end_layout \begin_layout Standard \series bold Distributiven bigrupoid \series default ima \series bold po eno \series default L in D distributivnost in je \series bold polkolobar \series default , če je \begin_inset Formula $\left(M,+\right)$ \end_inset komutativna polgrupa. \end_layout \begin_layout Standard \series bold Kolobar \series default je distri. bigrupoid, kjer je \series bold \begin_inset Formula $\left(M,+\right)$ \end_inset \series default abelova grupa. \end_layout \begin_layout Standard Pri \series bold asociativnem kolobarju \series default je \begin_inset Formula $\left(M,\cdot\right)$ \end_inset polgrupa. Lemut pravi, da je to pogoj že za kolobarje, Cimprič pa ne. \end_layout \begin_layout Standard Pri \series bold asociativnem kolobarju z enoto \series default je \begin_inset Formula $\left(M,\cdot\right)$ \end_inset monoid. \end_layout \begin_layout Standard \series bold Obseg \series default je kolobar z enoto za množenje \series bold \begin_inset Formula $1$ \end_inset \series default in inverzom za množenje za vsak neničeln element ( \begin_inset Formula $0$ \end_inset je enota za \begin_inset Formula $+$ \end_inset ). \end_layout \begin_layout Standard \series bold Komutativen kolobar \series default ima komutativno množenje. \end_layout \begin_layout Standard \series bold Polje \series default je komutativen obseg. \end_layout \begin_layout Standard \series bold Podbigrupoid \series default je \begin_inset Formula $N\subset M$ \end_inset , zaprta za \begin_inset Formula $+$ \end_inset in \begin_inset Formula $\cdot$ \end_inset . \end_layout \begin_layout Standard \series bold Podkolobar \series default je \begin_inset Formula $N\subset M$ \end_inset , da je \begin_inset Formula $N$ \end_inset podgrupa \begin_inset Formula $\left(M,+\right)$ \end_inset in podgrupoid \begin_inset Formula $\left(M,\cdot\right)$ \end_inset – \begin_inset Formula $N$ \end_inset zaprta za odštevanje in množenje. \end_layout \begin_layout Standard \series bold Podobseg \series default je podkolobar, kjer je \begin_inset Formula $N\backslash\left\{ 0\right\} $ \end_inset podgrupa \begin_inset Formula $\left(M\backslash\left\{ 0\right\} ,\cdot\right)$ \end_inset . \begin_inset Formula $0$ \end_inset namreč ni obrnljiva – \begin_inset Formula $N$ \end_inset zaprta za \begin_inset Formula $-$ \end_inset in deljenje. \end_layout \begin_layout Standard \series bold Homomorfizem kolobarjev \series default je \begin_inset Formula $f:M_{1}\to M_{2}\ni:f\left(a+_{1}b\right)=f\left(a\right)+_{2}f\left(b\right)\wedge f\left(a\cdot_{1}b\right)=f\left(a\right)\cdot_{2}f\left(b\right)$ \end_inset \end_layout \begin_layout Standard \series bold Homomorfizem kolobarjev z enoto \series default dodatno \begin_inset Formula $f\left(1_{1}\right)=1_{2}$ \end_inset \end_layout \begin_layout Paragraph Vektorski prostor \end_layout \begin_layout Standard je Abelova grupa z množenjem s skalarjem. \begin_inset Formula $F$ \end_inset je polje, za prostor \begin_inset Formula $\left(V,+,\cdot\right)$ \end_inset nad \begin_inset Formula $F$ \end_inset velja: \end_layout \begin_layout Itemize \begin_inset Formula $\left(V,+\right)$ \end_inset je Abelova grupa \end_layout \begin_layout Itemize \begin_inset Formula $\alpha\cdot\left(a+b\right)=\alpha\cdot a+\alpha\cdot b,\quad\left(\alpha+\beta\right)\cdot a=\alpha\cdot a+\beta\cdot a$ \end_inset \end_layout \begin_layout Itemize \begin_inset Formula $\left(\alpha\cdot\beta\right)\cdot a=\alpha\cdot\left(\beta\cdot a\right),\quad1\cdot a=a$ \end_inset \end_layout \begin_layout Standard \series bold Direktna vsota vektorskih prostorov \series default je vektorski prostor. \begin_inset Formula $V_{1}\oplus V_{2}$ \end_inset so pari \begin_inset Formula $\left(v_{1},v_{2}\right)$ \end_inset . \begin_inset Formula $\left(v_{1},v_{2}\right)+\left(v_{1}',v_{2}'\right)=\left(v_{1}+v_{1}',v_{2}+v_{2}'\right)$ \end_inset , \begin_inset Formula $\alpha\cdot\left(v_{1},v_{2}\right)=\left(\alpha\cdot v_{1},\alpha\cdot v_{2}\right)$ \end_inset . \end_layout \begin_layout Paragraph Vektorski podprostor \end_layout \begin_layout Standard je \begin_inset Formula $W\subseteq V,W\not=\emptyset$ \end_inset , zaprta za seštevanje in množenje s skalarjem. Oziroma taka, da vsebuje vse svoje linearne kombinacije — \begin_inset Formula $\forall a,b\in W\forall\alpha,\beta\in F:\alpha a+\beta b\in W$ \end_inset . Vsak podprostor vsebuje 0. \series bold Presek podprostorov \series default je tudi sam podprostor. \series bold Vsota podprostorov \series default ( \begin_inset Formula $W_{1}+W_{2}=\left\{ w_{1}+w_{2};w_{1}\in W_{1},w_{2}\in W_{2}\right\} $ \end_inset ) je tudi sama podprostor. \end_layout \begin_layout Standard \begin_inset ERT status open \begin_layout Plain Layout \backslash end{multicols} \end_layout \end_inset \end_layout \end_body \end_document