Utilisateur:MDCCCC/Notes

PD_t = patrimoine disponible au temps t

${\displaystyle \gamma {\text{ = taux de thesaurisation}}}$

${\displaystyle \rho {\text{ = taux de l'epargne productive (s - gamma) }}}$

${\displaystyle \tau _{C},\tau _{\mathrm {P} }{\text{ = taux de l'epargne improductive qui rentre dans le circuit}}}$

${\displaystyle \delta {\text{ = taux de l'epargne productive consommee}}}$

${\displaystyle PD_{0}=Y_{0}=cY_{0}+\gamma Y_{0}+\rho Y_{0}}$

${\displaystyle PD_{1}=C_{1}+S_{1}=cY_{1}+\gamma Y_{1}+\rho Y_{1}+(\gamma \cdot \tau _{C})Y_{0}+\rho \cdot \delta (1+r)Y_{0}+(\gamma \cdot \tau _{\mathrm {P} })Y_{0}+\rho (1-\delta )(1+r)Y_{0}+\gamma Y_{0}(\gamma -\tau _{C}-\tau _{\mathrm {P} })}$

${\displaystyle PD_{2}=C_{2}+S_{2}=cY_{2}+\gamma Y_{2}+\rho Y_{2}+(\gamma \cdot \tau _{C})Y_{1}+\rho \cdot \delta (1+r)Y_{1}+(\gamma \cdot \tau _{\mathrm {P} })Y_{1}+\rho (1-\delta )(1+r)Y_{1}+}$${\displaystyle \gamma Y_{1}(\gamma -\tau _{C}-\tau _{\mathrm {P} })+\delta (\gamma \cdot \tau _{\mathrm {P} })(1+r)Y_{0}+\delta \cdot \rho (1-\delta )(1+r)Y_{0}+(1-\delta )(\gamma \cdot \tau _{\mathrm {P} })(1+r)Y_{0}+}$${\displaystyle \rho (1-\delta )^{2}(1+r)Y_{0}+\tau _{C}\cdot \gamma Y_{0}(\gamma -\tau _{C}-\tau _{\mathrm {P} })+\tau _{\mathrm {P} }\cdot \gamma Y_{0}(\gamma -\tau _{C}-\tau _{\mathrm {P} })+\gamma Y_{0}(\gamma -\tau _{C}-\tau _{\mathrm {P} })^{2}}$

Général :${\displaystyle PD_{t}=cY_{t}+\tau _{C}\gamma \sum _{k=0}^{t-1}Y_{k}(\gamma -\tau _{C}-\tau _{\mathrm {P} })+\sum _{k=0}^{t}[Y_{k}(\gamma (\gamma -\tau _{C}-\tau _{\mathrm {P} })^{t-k}\tau _{\mathrm {P} }+\rho )\sum _{i=0}^{t-k}[((1-\delta )(1+r))^{i}+{\sum _{j=0}^{i-1}\delta (1-\delta )^{j}(1+r)^{j+1}]]}+\sum _{k=0}^{t}Y_{k}(\gamma (\gamma -\tau _{C}-\tau _{\mathrm {P} })^{t-k}}$${\displaystyle PD_{t}=cY_{t}+\sum _{k=0}^{t}[Y_{k}\sum _{i=0}^{t-k}[((1-\delta )(1+r))^{i}+{\sum _{j=0}^{i-1}\delta (1-\delta )^{j}(1+r)^{j+1}]]}}$ Say

${\displaystyle PD_{t}=\sum _{k=0}^{t}Y_{k}}$ Keynes

${\displaystyle PD_{t}^{\text{say}}-PD_{t}^{\text{keynes}}=cY_{t}+\sum _{k=0}^{t}Y_{k}[\sum _{i=0}^{t-k}[((1-\delta )(1+r))^{i}+{\sum _{j=0}^{i-1}\delta (1-\delta )^{j}(1+r)^{j+1}]-1]}}$

Général

${\displaystyle Y=C+S}$ 

• ${\displaystyle Y=C+G+I+(X-M)}$ 
• ${\displaystyle Y={\Sigma VA}+TVA+recettes\ douanieres-subventions}$ 
• ${\displaystyle Y=(w+EBE+r+VA+\Delta stocks)+(T-G+CCF)}$ 

${\displaystyle (S-I)=(Y-M)-(T-G)}$ 

${\displaystyle e_{x/y}={{\Delta x \over x} \over {\Delta y \over y}}}$ 

${\displaystyle Y=Y_{1}+(Y_{1}-C_{1})\times r+Y_{2}\Longleftrightarrow C_{2}=(Y_{1}-C_{1})\times (1+r)+Y_{2}}$ 

Setterfield et Cornwall

${\displaystyle \lambda =\lambda _{0}+\lambda _{g}g}$ 

${\displaystyle g=\gamma _{0}+\gamma _{\lambda }\lambda }$ 

${\displaystyle g=\gamma _{0}+\gamma _{\pi }\pi }$ 

${\displaystyle \pi =\pi _{0}+\pi _{\lambda }\lambda }$ 

${\displaystyle g=\gamma _{0}+\gamma _{\pi }\pi _{0}+(\gamma _{\pi }\pi _{\lambda })\lambda }$ 

${\displaystyle g=\gamma _{0}+\gamma _{\lambda }\lambda +\gamma _{\omega }(\omega -\lambda )}$ 

lambda = taux de croissance de la productivité

gamma = variation du taux de marge

g = croissance économique

pi = profits (part des profits???)

omega = taux de croissance du salaire réel

les "_" signifient "tirés par"

J.B. Say

${\displaystyle O=D}$ 

Keynes

${\displaystyle P_{m}C={\Delta C \over \Delta Y}\qquad PMC={C \over Y}\qquad P_{m}S={\Delta S \over \Delta Y}\qquad PMS={S \over Y}}$ 

${\displaystyle C=c\times Y+C_{0},}$  ${\displaystyle c\in ]0;1[}$ 

Marx

${\displaystyle {Pl \over V}\qquad {Pl \over C+V}\qquad {C \over V}}$ 

${\displaystyle {{Pl \over V} \over {C \over V}+1}}$ 

Gossen

${\displaystyle {d \over dx}U_{m}<0}$ 

${\displaystyle y=-{P_{x} \over P_{y}}x+{R \over P_{y}}}$ 

${\displaystyle {U_{m:x} \over P_{x}}={U_{m:y} \over P_{y}}}$ 

${\displaystyle K=-{p_{L} \over p_{K}}L+{B \over p_{K}}}$ 

Cobb-Douglass

${\displaystyle Y=F(K,L)=K^{\alpha }\times L^{1-\alpha },}$  ${\displaystyle \alpha \in ]0;1[}$ 

Piketty

${\displaystyle \alpha =r\times \beta }$ 

${\displaystyle \beta ={s \over g}}$ 

${\displaystyle b_{y}=\mu \times m\times \beta }$ 

Philip Wicksteed

${\displaystyle C=w\times h+R\Longleftrightarrow w\times (L_{0}-L)+R\Longleftrightarrow C+w\times L=w\times L_{0}+R}$ 

Bowley

${\displaystyle {L \over VA}={2 \over 3};{K \over VA}={1 \over 3}}$ 

Jean Fourastié

${\displaystyle {\Delta E \over E}={\Delta Y \over Y}-{\Delta Y_{L} \over Y_{L}}}$ 

Knut Wicksell

${\displaystyle {\Delta P \over P}={\Delta w \over w}-{\Delta Y_{L} \over Y_{L}}}$ 

(en étant funky on peut regrouper les 2 formules : ${\displaystyle {\Delta E \over E}={\Delta Y \over Y}+{\Delta P \over P}-{\Delta w \over w}}$ ).

Milton Friedman

${\displaystyle {C_{t}^{P}}=k\times {Y_{t}^{P}}}$ 

Daniel Cohen

${\displaystyle D={\text{dette}}}$ 

${\displaystyle {\Delta D \over Y}\ \neq \ {r\cdot D_{t-1}-SBP_{t} \over Y}}$  ; mais : ${\displaystyle \underbrace {\Delta D \over Y} _{\text{déficit public en pourcent du PIB}}\ =\ \underbrace {r\cdot D_{t-1}-SBP_{t} \over Y} _{\text{calcul déficit sans correction }}\ -\ \underbrace {p_{t}\cdot {D_{t-1} \over Y}} _{\text{taxe inflationiste}}-g_{\text{réel}}}$ 

Albert Aftalion - John Bates Clark : accélérateur

${\displaystyle I=\Delta K=v\times {\Delta Y}}$ 

Richard Kahn : multiplicateur keynésien

${\displaystyle k={1 \over s}}$ 

${\displaystyle \Delta Y=\Delta I\times k}$ 

Harrod - Domar

${\displaystyle g_{w}={s \over v}}$ 

${\displaystyle g\neq g_{w}\neq n}$ 

Nicholas Kaldor

${\displaystyle s=s_{w}+(s_{\pi }-s_{w})\times {\pi \over Y}}$ 

Robert Solow

${\displaystyle \Delta k=s\times f(k)-n\times k}$ 

${\displaystyle Y=F(A,K,L)=A\times K^{\alpha }\times L^{1-\alpha }}$ , ${\displaystyle \alpha \in ]0;1[}$