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All about Tseitin \(\mathbb{Q}\) \(\circ\) IND

Proof Systems

The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Resolution is exponential
- Source: tsQ+ind → CP → uCP → Res
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Truth table is exponential
- Source: tsQ+ind → CP → tlCP → tlRes → ttp
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Tree-like resolution is exponential
- Source: tsQ+ind → CP → tlCP → tlRes
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Regular resolution is exponential
- Source: tsQ+ind → CP → uCP → Res → regRes
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Ordered resolution is exponential
- Source: tsQ+ind → CP → uCP → Res → regRes → ordRes
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Pool resolution is exponential
- Source: tsQ+ind → CP → uCP → Res → poolRes
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Linear resolution is exponential
- Source: tsQ+ind → CP → uCP → Res → linRes
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Reversible resolution is exponential
- Source: tsQ+ind → CP → uCP → Res → revRes
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Cutting Planes is exponential
- Source: GGKS20 Monotone Circuit Lower Bounds from Resolution.
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Tree-like Cutting Planes is exponential
- Source: tsQ+ind → CP → tlCP
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Cutting Planes with Unary Coefficients is exponential
- Source: tsQ+ind → CP → uCP
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Semantic Cutting Planes is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Cutting Planes with Saturation is exponential
- Source: tsQ+ind → CP → uCP → Res → saturationCP
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Stabbing Planes is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Stabbing Planes with Unary Coefficients is exponential
- Source: tsQ+ind → CP → uSP
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Res(CP) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Res(LP) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Res(CP) with unary coefficients is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Res(LP) with unary coefficients is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Res(L\(\&\)P) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Res(L\(\&\)P) with unary coefficients is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Semantic degree-k threshold system, treelike version is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Polynomial Calculus over \(\mathbb{F}_2\) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Nullstellensatz over \(\mathbb{F}_2\) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in ResLin over \(\mathbb{Q}\), ResLin, Resolution over linear equations over rationals is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in unary ResLin over \(\mathbb{Q}\), ResLin, Resolution over linear equations over rationals is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in ResLin over \(\mathbb{F}_2\), Res(\(\oplus\)) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Tree-like ResLin over \(\mathbb{F}_2\), treelike Res(\(\oplus\)) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Polynomial Calculus over \(\mathbb{Q}\) is at most quasipolynomial
- Source: PC_Q → NS_Q → tsQ+ind
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Nullstellensatz over \(\mathbb{Q}\) is at most quasipolynomial
- Source: GKRS19 Adventures in Monotone Complexity and TFNP.
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Hitting is exponential
- Source: tsQ+ind → CP → tlCP → tlRes → hit
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Lift and Project is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Lift and Project with unary coefficients is exponential
- Source: tsQ+ind → CP → uCP → uL&P
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Positivstellensatz Calculus is at most quasipolynomial
- Source: PSC → PS → SoS → SA → NS_Q → tsQ+ind
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Positivstellensatz is at most quasipolynomial
- Source: PS → SoS → SA → NS_Q → tsQ+ind
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Lovász--Schrijver (LS) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Lovász--Schrijver with squares (LS\(_+\)) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Lovász--Schrijver with squares (LS\(_+^d\)), bounded degree is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Lovász--Schrijver with squares (LS\(_+^\infty\)), unbounded degree is at most quasipolynomial
- Source: LSn+ → PSC → PS → SoS → SA → NS_Q → tsQ+ind
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Cone Proof System is at most quasipolynomial
- Source: CPS → LSn+ → PSC → PS → SoS → SA → NS_Q → tsQ+ind
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in tl Lovász--Schrijver (LS) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Lovász--Schrijver with squares (LS\(_+\)) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Lovász--Schrijver with squares (LS\(_+^d\)), bounded degree, treelike is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in static Lovász--Schrijver (static LS) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in static Lovász--Schrijver, with squares of linear functions (static LS\(_+\)) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in static Lovász--Schrijver, with squares of linear functions (static LS\(_+^n\)) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Sum of Squares (Lasserre) is at most quasipolynomial
- Source: SoS → SA → NS_Q → tsQ+ind
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Sherali--Adams is at most quasipolynomial
- Source: SA → NS_Q → tsQ+ind
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Circular resolution is at most quasipolynomial
- Source: circRes → SA → NS_Q → tsQ+ind
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Unary Sherali--Adams is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Ideal Proof System is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Extended Frege is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Extended resolution is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Frege is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in \(\mathrm{AC}^0\)-Frege is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in k-DNF Resolution is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in \(\mathrm{TC}^0\)-Frege is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in \(\mathrm{AC}^0\)-Frege with mod 2 axioms is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in \(\mathrm{AC}^0\)-Frege with mod 2 gates is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in OBDD(join,weakening) is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in LK is [missing?]
The size complexity of Tseitin \(\mathbb{Q}\) \(\circ\) IND in Zermelo-Fraenkl Set Theory with the Axiom of Choice is [missing?]

This database is still incomplete; missing data may indicate either the information was not yet recorded or an open problem. Users are encouraged to contribute missing proof systems and/or relations at https://gitlab.com/proofcomplexityzoo/zoo.

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