Is Physics in the Infinite Momentum Frame Independent of the Compactification Radius?

@inproceedings{Guijosa1998IsPI,
  title={Is Physics in the Infinite Momentum Frame Independent of the Compactification Radius?},
  author={Alberto Guijosa},
  year={1998}
}

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References

SHOWING 1-10 OF 28 REFERENCES

Theory As A Matrix Model : A Conjecture

We suggest and motivate a precise equivalence between uncompactified eleven dimensional M-theory and the N = ∞ limit of the supersymmetric matrix quantum mechanics describing D0 branes. The evidence

M theory as a matrix model: A Conjecture

We suggest and motivate a precise equivalence between uncompactified 11-dimensional M theory and the N={infinity} limit of the supersymmetric matrix quantum mechanics describing D0 branes. The

Another Conjecture about M(atrix) Theory

The current understanding of M(atrix) theory is that in the large N limit certain supersymmetric Yang Mills theories become equivalent to M-theory in the infinite momentum frame. In this paper the

SUPERSTRING THEORY

A comment on compactification of M-theory on an (almost) light-like circle

Gauge theory, geometry and the large-N limit

The parton picture of elementary particles

D particle dynamics and bound states

We study the low energy effective theory describing the dynamics of D-particles. This corresponds to the quantum-mechanical system obtained by dimensional reduction of (9+1)-dimensional

Why Is the Matrix Model Correct

We consider the compactification of M theory on a lightlike circle as a limit of a compactification on a small spatial circle boosted by a large amount. Assuming that the compactification on a small