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leblonDear Mr. X,
I would extremely appreciate your opinion on definition of the total black
hole partition function via the Feynmanian integral over moduli space M
Z_BH = int_M DM Z_TOP (M)
Define graded Hopf/Grothendieck-Teichmuller group manifold M, whose
submoduli spaces of graded moduli space generate the modular union by
the inclusion system
qE_8 -> qE_9 -> qE_10 -> ... -> qE_n
Moduli space of graded hyperbolic quantum deformed group manifold M leads to
exponential growth of rank of holographically dual group of cascading throat
of generalized conifold and in the process whose Weyl group of root space
makes rank of vacuum torsion variable. Total number of generators grows
expo-exponentially with exponentially growing rank of M. Outgrowth is that
the roots of M have uncountable degeneration. Ireducible representation of
U-dual modular group M are K-theoretic knots of dilaton/tachyon which are
just condensates of one unstable graded quantum deformed octonionic black
hole throat. We identify T-dual modular group which makes the group rank
variable, S-duality cascade of generalized conifold throat and U-duality
chain which permutes NS-NS/R-R potentials and arbitrarily sets dilaton value
on the one side, with affine Weyl group of quantum deformed root system of M
on the other side.
There exists isomorphism between U-dual modular group M and moduli space of
U-dual instanton. The interchange of moduli of U-dual instanton is just
Weyl transformation in M. Isomorphism between topological amplitudes of
U-dual instanton and root lattice of M provides information about algebraic
structure of nonperturbative contributions to vacuum potential. U-dual flux
through U-dual cycle is
Ng = int psi = V_vaccum = 0
Monodromy of M makes volume of U-dual cycle and dimension of wrapping U-dual
brane variable. (Group manifold M permutes charges of the U-dual black
brane/U-dual vacuum torsion.)
There exists module homomorphism between affine Weyl group of root space M
and nonassociative deformed fractal attractor of condensation of Hagedornian
tachyon/U-dual instanton inside deformed throat of generalized conifold
(throat which fills group manifold M). Hagedornian tachyon orbits of affine
Weyl group of U-dual root system is fundamental observation. U-dual black
hole throat degenerations are determined by the U-dual automorphic forms
(degenerations are generalized Fourier coefficients of modular forms of M).
Outgrowth is that nilpotent orbits of M defines topological string
amplitudes. Thus we're Feynmanian integrating over U-dual modular space M
because of U-dual instanton tunneling amplitude we require observe. Notable
consequence is uncountably degenerate U-dual root space = uncountably degenerate U-dual
black hole throat = int_M DM Z_TOP (M) = 0
Thank you very much for your opinion on this consequence!
Вот какие большие огурцы продают в наших магазинах!
I would extremely appreciate your opinion on definition of the total black
hole partition function via the Feynmanian integral over moduli space M
Z_BH = int_M DM Z_TOP (M)
Define graded Hopf/Grothendieck-Teichmuller group manifold M, whose
submoduli spaces of graded moduli space generate the modular union by
the inclusion system
qE_8 -> qE_9 -> qE_10 -> ... -> qE_n
Moduli space of graded hyperbolic quantum deformed group manifold M leads to
exponential growth of rank of holographically dual group of cascading throat
of generalized conifold and in the process whose Weyl group of root space
makes rank of vacuum torsion variable. Total number of generators grows
expo-exponentially with exponentially growing rank of M. Outgrowth is that
the roots of M have uncountable degeneration. Ireducible representation of
U-dual modular group M are K-theoretic knots of dilaton/tachyon which are
just condensates of one unstable graded quantum deformed octonionic black
hole throat. We identify T-dual modular group which makes the group rank
variable, S-duality cascade of generalized conifold throat and U-duality
chain which permutes NS-NS/R-R potentials and arbitrarily sets dilaton value
on the one side, with affine Weyl group of quantum deformed root system of M
on the other side.
There exists isomorphism between U-dual modular group M and moduli space of
U-dual instanton. The interchange of moduli of U-dual instanton is just
Weyl transformation in M. Isomorphism between topological amplitudes of
U-dual instanton and root lattice of M provides information about algebraic
structure of nonperturbative contributions to vacuum potential. U-dual flux
through U-dual cycle is
Ng = int psi = V_vaccum = 0
Monodromy of M makes volume of U-dual cycle and dimension of wrapping U-dual
brane variable. (Group manifold M permutes charges of the U-dual black
brane/U-dual vacuum torsion.)
There exists module homomorphism between affine Weyl group of root space M
and nonassociative deformed fractal attractor of condensation of Hagedornian
tachyon/U-dual instanton inside deformed throat of generalized conifold
(throat which fills group manifold M). Hagedornian tachyon orbits of affine
Weyl group of U-dual root system is fundamental observation. U-dual black
hole throat degenerations are determined by the U-dual automorphic forms
(degenerations are generalized Fourier coefficients of modular forms of M).
Outgrowth is that nilpotent orbits of M defines topological string
amplitudes. Thus we're Feynmanian integrating over U-dual modular space M
because of U-dual instanton tunneling amplitude we require observe. Notable
consequence is uncountably degenerate U-dual root space = uncountably degenerate U-dual
black hole throat = int_M DM Z_TOP (M) = 0
Thank you very much for your opinion on this consequence!
Вот какие большие огурцы продают в наших магазинах!
