For Lipschitz continuity sake, let us consider the Slutsky equation.

in #lipschitz-slutsky6 years ago (edited)

Getting to the Hotelling's lemma for SBIR ESCO Teaming Agreements, Serenity Sells suggests, Excel statistical analysis of mass convergence in a Debye torodial moment with lepton kinetic enthalpy

Where is the creativity in Graduate dissertation titles these days?

K.I.S.S.
Keep It Simple Silly

kiss ass
phrase of kiss
North American
vulgar slang
behave in an obsequious or sycophantic way.

In mathematical analysis, Lipschitz continuity, named after Rudolf Lipschitz, is a strong form of uniform continuity for functions.

The Strange Numbers That Birthed Modern Algebra
The 19th-century discovery of numbers called “quaternions” gave mathematicians a way to describe rotations in space, forever changing physics and math.
By Charlie Wood

In computational physics and chemistry, the Hartree–Fock (HF) method is a method of approximation for the determination of the wave function and the energy of a quantum many-body system in a stationary state.

The Hartree–Fock method often assumes that the exact, N-body wave function of the system can be approximated by a single Slater determinant (in the case where the particles are fermions) or by a single permanent (in the case of bosons) of N spin-orbitals. By invoking the variational method, one can derive a set of N-coupled equations for the N spin orbitals. A solution of these equations yields the Hartree–Fock wave function and energy of the system.

Especially in the older literature, the Hartree–Fock method is also called the self-consistent field method (SCF). In deriving what is now called the Hartree equation as an approximate solution of the Schrödinger equation, Hartree required the final field as computed from the charge distribution to be "self-consistent" with the assumed initial field. Thus, self-consistency was a requirement of the solution.

Again, the Hartree-Fock method seeks to approximately solve the electronic Schrödinger equation, and it assumes that the wavefunction can be approximated by a single Slater determinant made up of one spin orbital per electron.

Debye toroidal moment of surface plasmons as SBIR ESCO model

Turkish authorities detain 60 over alleged Gulen links

As far as loose Lipschitz that continually sink Slutsky equation ships:

Northern Trust owns ABA, IRS and Serco owns USPTO

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These are gorgeous and strong, friend.

Strong as monstrous moonshine?

In mathematics, monstrous moonshine, or moonshine theory, is the unexpected connection between the monster group M and modular functions, in particular, the j function. The term was coined by John Conway and Simon P. Norton in 1979.

What the pill munching Pac Man? In mathematics, and in particular, in the mathematical background of string theory, the Goddard–Thorn theorem (also called the no-ghost theorem) is a theorem describing properties of a functor that quantizes bosonic strings. The name "no-ghost theorem" stems from the fact that in the original statement of the theorem, the natural inner product induced on the output vector space is positive definite. Thus, there were no so-called ghosts (Pauli–Villars ghosts), or vectors of negative norm. For playing the game of Go at a Buddhist temple during closing hours sake, the name "no-ghost theorem" is also a word play on the no-go theorem of quantum mechanics. "If Pac-Man had affected us as kids, we'd all be running around in dark rooms, munching pills and listening to repetitive electronic music." - Marcus Brigstocke

Liberty sandwich, hold the octonions!
Simpson's rule Consumer Problem with Hicksian demand
"I'll gladly pay you Tuesday for a hamburger today."
Doh!

So splendid and killer m8

Ain't' mutton! Shephard's lemma is a major result in microeconomics having applications in the theory of the firm and in consumer choice. Slutsky Equation, Roy's Identity and Shephard's Lemma London Disperson Forces... I got your Stirling number of the second kind! Close encounters of the Stirling numbers of the third kind too! Hotelling's law is an observation in economics that in many markets it is rational for producers to make their products as similar as possible. This is also referred to as the principle of minimum differentiation as well as Hotelling's linear city model. Does it go the Manhattan distance in a Random walk? The observation was made by Harold Hotelling (1895–1973) in the article "Stability in Competition" in Economic Journal in 1929.


A fermion is just a particle of half-integer spin. Being a lepton for a particle is a matter of definition of global symmetries of the theory. This means that a lepton can in principle be both a fermion or a boson, although all known leptons are fermions (electron, muon, tau and their neutrinos). The lightest baryon is the proton, and it is the only stable baryon. Since the neutron decays by n --> p + e - + νe and the electron and anti-neutrino are leptons, not baryons, B conservation requires that the neutron is also baryon. Three Laws, Four Basic Forces and Four types of bonds

That's classic and nice.

'As you sow so shall you reap' (differentiable vector fields for solving Fröhlich Holstein Hamiltonians) Wheels Within Wheels, Like a Gyroscope from Ezekiel 1

Mantis shrimp appear to use a simple yet speedy system to detect colour. Mantis shrimp don't see colour like we do. The mantis shrimp has anywhere from 12 to 16 different photoreceptors in its midband. Although the crustaceans have many more types of light-detecting cell than humans, their ability to discriminate between colours is limited, says a report. Alpheidae is a family of caridean snapping shrimp characterized by having asymmetrical claws, the larger of which is typically capable of producing a loud snapping sound. Solar v Coal, Montreux Convention, Crude Tanker War trader with Bridges transition Smale's solutions


Smale's Problems, modulus and argument with Bridges' Transition Model