It is the Higgs Interaction with particles, that breaks the symmetry of electroweak theory...
If you put additional interaction, these symmetries can break and that is what the Higgs Field does
Almost, but not quite. The interaction is not what breaks the symmetry. The entire Lagrangian, including the interaction terms of the Higgs with the other particles, is gauge invariant. That's a basic requirement!
The breaking of the symmetry is spontaneous, meaning that it is due to the nonzero vacuum expectation value of the Higgs field.
For example, the usual Dirac mass term can be written in terms of right- and left-handed spinors as m(
ψLψ
R +
ψRψ
L). This would not be gauge invariant, since ψ
L transforms as an SU(2) doublet while ψ
R transforms as an SU(2) singlet. To replace it with something that is gauge invariant we introduce a Higgs field φ, and write G(
ψLφψ
R +
ψRφψ
L), where G is a coupling constant. This will be gauge invariant, for example, if φ is also an SU(2) doublet (the usual assumption). After the symmetry is spontaneously broken, φ acquires the vacuum expectation value
\left(\begin{array}{c}0\\v\end{array}\right)
and the Lagrangian becomes Gv(
ψLψ
R +
ψRψ
L) which acts as a Dirac mass term.
