We anew explain the meaning of negative energies in the relativistic theory. On the basis we present two new conjectures. According to the conjectures, particles have two sorts of existing forms which are symmetric. From this we present a new Lagrangian density and a new quantization method for QED. That the energy of the vacuum state is equal to zero is naturally obtained. From this we can easily determine the cosmological constant according to experiments, and it is possible to correct nonperturbational methods which depend on the energy of the ground state in quantum field theory
When a nonrelativistic particle interacts with a scalar quantum field, the standard perturbation the...
The geometrical formulation of the quantum Hamilton-Jacobi theory shows that the quantum potential i...
The left hand side of Einstein's equations G=-T is defined as the tensor of energy-momentum of gravi...
We anew explain the meaning of negative energies in the relativistic theory. On the basis we present...
We suppose that there are both particles with negative energies described by $\QTR{cal}{L}_{W}$ and ...
Negative energy density is unavoidable in the quantum theory of field. We give a revised proof of th...
The action for gravity and the standard model includes, as well as the positive energy fermion and b...
Building on the "quantum inequalities" introduced by Ford, I argue that the negative local energies ...
It is shown that the zero-point energies of free quantum fields diverge at most quadratically and no...
The vacuum is not a state of empty space, but is populated by electromagnetic fluctuations at a lowe...
At the quantization of fields, due to the non-linear character of the time reversal, the creation-an...
We propose a method of field quantization which uses an indefinite metric in a Hilbert space of stat...
It is well known that there can be negative energy densities in quantum field theory. Most of the wo...
In quantum field theory there exist states for which the energy density is negative. It is important...
Starting from an (unknown) quantum gravitational model, one can invoke a sequence of approximations ...
When a nonrelativistic particle interacts with a scalar quantum field, the standard perturbation the...
The geometrical formulation of the quantum Hamilton-Jacobi theory shows that the quantum potential i...
The left hand side of Einstein's equations G=-T is defined as the tensor of energy-momentum of gravi...
We anew explain the meaning of negative energies in the relativistic theory. On the basis we present...
We suppose that there are both particles with negative energies described by $\QTR{cal}{L}_{W}$ and ...
Negative energy density is unavoidable in the quantum theory of field. We give a revised proof of th...
The action for gravity and the standard model includes, as well as the positive energy fermion and b...
Building on the "quantum inequalities" introduced by Ford, I argue that the negative local energies ...
It is shown that the zero-point energies of free quantum fields diverge at most quadratically and no...
The vacuum is not a state of empty space, but is populated by electromagnetic fluctuations at a lowe...
At the quantization of fields, due to the non-linear character of the time reversal, the creation-an...
We propose a method of field quantization which uses an indefinite metric in a Hilbert space of stat...
It is well known that there can be negative energy densities in quantum field theory. Most of the wo...
In quantum field theory there exist states for which the energy density is negative. It is important...
Starting from an (unknown) quantum gravitational model, one can invoke a sequence of approximations ...
When a nonrelativistic particle interacts with a scalar quantum field, the standard perturbation the...
The geometrical formulation of the quantum Hamilton-Jacobi theory shows that the quantum potential i...
The left hand side of Einstein's equations G=-T is defined as the tensor of energy-momentum of gravi...