Diophantine approximation in the field Q(i(111/2))

Beginning with an improvement to Dirichlet's Theorem on simultaneous approximation, in this paper we introduce an alogrithm, in sympathy with the classical continued fraction algorithm, to generate the sequence of best approximates to the system max[&: 0 n&, &: 1 n&, ..., &: L n&] in the case when :

B. deMathan (1970, Bull. Soc. Math. France Supl. Mem. 21) proved that Khintchine's Theorem has an analogue in the field of formal Laurent series. First, we show that in case of only one inequality this result can also be obtained by continued fraction theory. Then, we are interested in the number o

## DATTA AND MALLIK Fe 2q and 134 and 181 s in the presence of Fe 2q . These are in good agreement with the observed values which are f 100 and f 200 s when Fe 2q is present in the matrix and which are known to be almost twice as large when the Fe 2q is evicted from the matrix. The present work als

We study the ground state binding energy of the H: ion in an intense magnetic field. Our calculations are based on improved forms of the adiabatic approximation. We calculate the binding energy, the equilibrium internuclear separation and the zero point energies of nuclear vibrations both parallel